# Find n highest numbers

There are millions of integers are given. How to find out n largest numbers from this? Note that since the input is huge i cant store anything in the memory.

Any suggestions?

Thanks shag

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How large is `n`? Enough to store all the results in memory? –  millimoose Feb 13 '12 at 13:18
largest == biggest? –  shift66 Feb 13 '12 at 13:19
Show some code. –  juergen d Feb 13 '12 at 13:20
Is this a homework? If yes pls tag it so. –  anubhava Feb 13 '12 at 13:21
Near-duplicate of stackoverflow.com/q/9236387/166749 and several other recent questions. –  larsmans Feb 13 '12 at 13:21

You can iterate through all numbers (reading them from a media one by one for example) and only keep a list with the 10 maximum numbers.

In pseudo code:

``````max_numbers = new int[n]
until not end of file:
if number > min(max_numbers):
'copy number to minimum value of max_numbers'
``````
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Just have an array of n elements and if you find one number that is bigger than the smallest in the array, you can change it.

You could keep an extra variable where you keep the smallest number in the array so you only iterate on it when you know you have to change something.

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Get an array of 10 length, while you run through numbers, swap the smallest with a new bigger.

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``````public void largest() {
int _current, _highest, _lowest;

if(_current >= _highest) {
_highest = _current;
} else if(_current <= _lowest) {
_lowest = _current;
}
}
``````

What I would do.

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Maintain a Max-Heap of size `n`.

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this will work, but it will run in Nlog(N), whereas the ideal solution can be done in N time. –  zzz Mar 21 '12 at 21:34
@Eric: Can you please explain? –  Bhushan Dec 19 '12 at 0:38

EDITED

I recommend forming a priority-queue (heap based), taking Michael's suggestion to it's logical conclusion. Don't store 10, store n.

``````PQ a[n];
a.insert(input);
``````

`O(log n)` FTW

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Nope, a heap gives the answer in O(N lg n) where N is in the millions. Also, you need a min-heap for this task. –  larsmans Feb 13 '12 at 13:22
You'd have to keep all the input in memory for this unless you modified the heap to only have a predetermined maximum depth. I'd argue this makes a wikipedia link answer too vague to be helpful. –  millimoose Feb 13 '12 at 13:27
Changed my answer. Please review. –  A T Feb 13 '12 at 13:27
The O(log n) claim is still bogus. You can't not read the input. I.e. you can't get better than O(N • log n), but you can't omit the factor because of that. (Disclaimer: I didn't downvote.) Also, the priority queue would still have to be bounded. –  millimoose Feb 13 '12 at 13:41
Cool fact: you can do it in O(n), but not without some really complex data structures. –  Louis Wasserman Feb 13 '12 at 16:20